AbstractThe paper concerns fundamental variational principles and the Caristi fixed point theorem. The Brézis–Browder theorem is extended and Altmanʼs theorem is investigated. The notion of istance, an extension of ω-distance, is defined. The new concept enables us to prove some elegant and general variational principles which imply a much stronger form of the Caristi and the Takahashi fixed point theorems. Another consequence is an advanced version of the Ekeland variational principle
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...
We shall show that a recent version of Ekeland's principle in F-type topological spaces due to ...
Abstract In this paper, a new version of Ekeland’s variational principle by using the concept of τ-d...
In this paper, we extend the study that was initiated by Hamel [7] on the relationship among theorem...
In a well known paper [3], Ekeland presented a variational principle that can be used for many usefu...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland's varia...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland'...
We consider a distance function on generalized metric spaces and we get a generalization of Ekeland ...
AbstractThe main purpose of this paper is to introduce the concept ofF-type topological spaces and t...
[[abstract]]In this paper, we first give a generalized Takahashi’s existence theorem. From the exist...
AbstractWe present a simple proof of vectorial Ekeland's variational principle, vectorial Caristi's ...
AbstractThe paper concerns fundamental variational principles and the Caristi fixed point theorem. T...
AbstractIn this paper, we introduce the concept of τ-function which generalizes the concept of w-dis...
In this paper, lower semi-continuous functions are used to extend Ekeland’s variational principle to...
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...
We shall show that a recent version of Ekeland's principle in F-type topological spaces due to ...
Abstract In this paper, a new version of Ekeland’s variational principle by using the concept of τ-d...
In this paper, we extend the study that was initiated by Hamel [7] on the relationship among theorem...
In a well known paper [3], Ekeland presented a variational principle that can be used for many usefu...
Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, p...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland's varia...
With a recent result of Suzuki (2001) we extend Caristi-Kirk's fixed point theorem, Ekeland'...
We consider a distance function on generalized metric spaces and we get a generalization of Ekeland ...
AbstractThe main purpose of this paper is to introduce the concept ofF-type topological spaces and t...
[[abstract]]In this paper, we first give a generalized Takahashi’s existence theorem. From the exist...
AbstractWe present a simple proof of vectorial Ekeland's variational principle, vectorial Caristi's ...
AbstractThe paper concerns fundamental variational principles and the Caristi fixed point theorem. T...
AbstractIn this paper, we introduce the concept of τ-function which generalizes the concept of w-dis...
In this paper, lower semi-continuous functions are used to extend Ekeland’s variational principle to...
Functions defined on metric spaces are studied. For these functions, a generalized Caristi-like cond...
We shall show that a recent version of Ekeland's principle in F-type topological spaces due to ...
Abstract In this paper, a new version of Ekeland’s variational principle by using the concept of τ-d...